What is the relationship between the sine and cosine of the complementary angles in this diagram?

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Both Sin(48°) and Cos(x°) can be represented by the ratio b:c. Complementary angles are those angles, the sum of which is 90°.

Complementary Angles

The Two angles, which when added gives the result 90 degrees is called complementary angles. In the given question both Sin(48°) and Cos(x°) can be represented by ratio b÷c, because value of Sin(48) and Cos(x) are b÷c.

Since 48° and x° are complementary angles, hence the value of x will be = 42 degrees. And Sin(48°) = Cos(x°), therefore Sin(48°) = Cos(90° - 48°).

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What is the relationship between the sine and cosine of the complementary angles in this diagram? Drag and drop the answers into the boxes to correctly complete the statements.

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Complementary Angles

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What is the relationship between the sine and cosine of the complementary angles in this diagram?

Drag and drop the answers into the boxes to correctly complete the statements.